Two-temperature statistics of free energies in (1+1) directed polymers

Abstract

The joint statistical properties of two free energies computed at two different temperatures in the same sample of (1+1) directed polymers is studied in terms of the replica technique. The scaling dependence of the reduced free energies difference F = F(T1)/T1 - F(T2)/T2 on the two temperatures T1 and T2 is derived. In particular, it is shown that if the two temperatures T1 \, < \, T2 are close to each other the typical value of the fluctuating part of the reduced free energies difference F is proportional to (1 - T1/T2)1/3. It is also shown that the left tail asymptotics of this free energy difference probability distribution function coincides with the corresponding tail of the TW distribution.